Differentiability of transition semigroup of generalized Ornstein-Uhlenbeck process: a probabilistic approach

Abstract

Let Psφ(x)=E\, φ(Xx(s)), be the transition semigroup on the space Bb(E) of bounded measurable functions on a Banach space E, of the Markov family defined by the linear equation with additive noise d X(s)= (AX(s) + a)ds + BdW(s), X(0)=x∈ E. We give a simple probabilistic proof of the fact that null-controlla\-bility of the corresponding deterministic system d Y(s)= (AY(s)+ BU(t)x)(s))ds, Y(0)=x, implies that for any φ∈ Bb(E), Ptφ is infinitely many times Fr\'echet differentiable and that DnPtφ(x)[y1,… ,yn]= E\, φ(Xx(t))(-1)nInt(y1,…, yn), where Int(y1,…,yn) is the symmetric n-fold It\o integral of the controls U(t)y1,… U(t)yn.

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